# Left recursion elimination

I have this grammar

``````S->S+S|SS|(S)|S*|a
``````

I want to know how to eliminate the left recursion from this grammar because the `S+S` is really confusing...

-

Let's see if we can simplify the given grammar.

``````S -> S*|S+S|SS|(S)|a
``````

We can write it as;

``````S -> S*|SQ|SS|B|a
Q -> +S
B -> (S)
``````

Now, you can eliminate left recursion in familiar territory.

``````S  ->  BS'|aS'
S' ->  *S'|QS'|SS'|e
Q  ->  +S
B  ->  (S)
``````

Note that e is epsilon/lambda.

We have removed the left recursion, so we no longer have need of Q and B.

``````S  ->  (S)S'|aS'
S' ->  *S'|+SS'|SS'|e
``````
-

My answer using theory from this reference

## How to Eliminate Left recursion in Context-Free-Grammar.

``````S -->  S+S | SS | S*    |        a | (S)
--------------            -------
Sα form                   β form
Left-Recursive-Rules      Non-Left-Recursive-Rules
``````

We can write like

S ---> Sα1 | Sα2 | Sα3 | β1 | β2

Rules to convert in equivalent Non-recursive grammar:

S ---> β1 | β2
Z ---> α1 | α2 | α3
Z ---> α1Z | α2Z | α3Z
S ---> β1Z | β2Z

Where

α1 = +S
α2 = S
α3 = *

And `β`-productions not start starts with `S`:

β1 = a
β2 = (S)

Grammar without left-recursion:

Non- left recursive Productions S --> βn

``````S -->  a | (S)
``````

Introduce new variable `Z` with following productions: Z ---> αn and Z --> αnZ

``````Z --> +S | S | *

and

Z --> +SZ | SZ | *Z
``````

And new `S` productions: S --> βnZ

``````S -->  aZ | (S)Z
``````

Productions `Z --> +S | S | *` and `Z --> +SZ | SZ | *Z` can be combine as `Z --> +SZ | SZ | *Z| ^` where `^` is null-symbol.
`Z --> ^` use to remove `Z` from production rules.
`S --> aZ | (S)Z` and `Z --> +SZ | SZ | *Z| ^`